Chapter 1

1. Chapter 1 Basics of Geometry

2. Section 6Angle Pair Relationships

3. Two angles are ___________________ if their sides form two pairs of opposite rays. Two adjacent angles are a _________________ if their noncommon sides are opposite rays. In this book, you can assume from a diagram that two adjacent angles form a linear pair if the noncommon sides appear to lie on the same line. 5 1 6 2 4 3 <1 and <3 are vertical angles. <2 and <4 are vertical angles. < 5 and <6 are a linear pair.

4. Example 1: Identifying Vertical Angles and Linear Pairs • Are <2 and <3 a linear pair? • Are <3 and <4 a linear pair? • Are <1 and <3 vertical angles? • Are <2 and <4 vertical angles? 1 2 4 3

5. Note: • Vertical angles are congruent • The sum of the measures of angles that form a linear pair is 180. We will discuss this more in Chapter 2.

6. Example 2: Finding Angle Measures In the stair railing shown at the right, <6 has a measure of 130. Find the measures of the other three angles.

7. A (3x + 5) E D (y + 20) (x + 15) (4y – 15) B Example 3: Finding Angle Measures Solve for x and y. Then find the angle measures. C

8. GOAL 2: Complementary and Supplementary Angles Two angles are _______________________ if the sum of their measures is 90. Each angle is the _____________ of the other. Complementary angles can be adjacent or nonadjacent. Two angles are _______________________ if the sum of their measures is 180. Each angle is the ______________ of the other. Supplementary angles can be adjacent or nonadjacent.

9. Example 4: Identifying Angles State whether the two angles are complementary, supplementary, or neither.

10. Example 5: Finding Measures of Complements and Supplements a. Given that <A is a complement of <C and m<A = 47, find m<C. b. Given that <P is a supplement of <R and m<R = 36, find m<P.

11. Example 6: Finding the Measure of a Complement <W and <Z are complementary. The measure of <Z is five times the measure of <W. Find m<W.